Definitions from Wikipedia (Hilbert class field)
▸ noun: In algebraic number theory, the Hilbert class field E of a number field K is the maximal abelian unramified extension of K. Its degree over K equals the class number of K and the Galois group of E over K is canonically isomorphic to the ideal class group of K using Frobenius elements for prime ideals in K.
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▸ noun: In algebraic number theory, the Hilbert class field E of a number field K is the maximal abelian unramified extension of K. Its degree over K equals the class number of K and the Galois group of E over K is canonically isomorphic to the ideal class group of K using Frobenius elements for prime ideals in K.
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▸ Usage examples for hilbert class field
▸ Idioms related to hilbert class field
▸ Wikipedia articles (New!)
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▸ Rhymes of hilbert class field
▸ Invented words related to hilbert class field